A partial uniqueness result and an asymptotically sharp nonuniqueness result for the Zhikov problem on the torus
Abstract
We consider the stationary diffusion equation -div (∇ u + bu )=f in n-dimensional torus Tn, where f∈ H-1 is a given forcing and b∈ Lp is a divergence-free drift. Zhikov (Funkts. Anal. Prilozhen., 2004) considered this equation in the case of a bounded, Lipschitz domain ⊂ Rn, and proved existence of solutions for b∈ L2n/(n+2), uniqueness for b∈ L2, and has provided a point-singularity counterexample that shows nonuniqueness for b∈ L3/2- and n=3,4,5. We apply a duality method and a DiPerna-Lions-type estimate to show uniqueness of the solutions constructed by Zhikov for b∈ W1,1. We use a Nash iteration to demonstrate sharpness of this result, and also show that solutions in H1 Lp/(p-1) are flexible for b∈ Lp, p∈ [1,2(n-1)/(n+1)); namely we show that the set of b∈ Lp for which nonuniqueness in the class H1 Lp/(p-1) occurs is dense in the divergence-free subspace of Lp.
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